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Transcript 
4.6: Rank
Definition:
Let A be an mxn matrix. Then each row of A has n entries and
can therefore be associated with a vector in  n
The set of all linear combinations of the row vectors in A is called
the row space of A.
Example:
 2
 1
A
 3

 1

5
8
0
3
5
1
11
 19
7
7
 13
5
Row Space of A 
 17 
5 
1 

3 
Theorem 13
If two matrices A and B are row equivalent, then their row spaces
are the same.
If B is in echelon form, the nonzero rows of B form
a basis for the row space of A as well as for that of B.
rref
Example: Find the bases for the row space and column space
of the matrix A.
1
0

A :  3

3
 2
3
1
0
4
0
3
1
0 
6  1

2 1 
 4  2
1
1
0

rref ( A) : 0

0
0
3 1 3
1 1 0
0 0 1

0 0 0
0 0 0
Definition
The rank of A is the dimension of the column space of A.
Theorem 14 (The Rank Theorem)
The dimensions of the column space and the row space of an
m n matrix A are equal. This common dimension, the rank of
A, also equals the number of pivot positions in A and satisfies
rank A  dim Nul A  n
rank A  nullity A  n
Example:
1. If A is a 810matrix with a three-dimensional null space,
what is the rank of A?
2. Could a 512 matrix have a three-dimensional null space?
Example:
A scientist has found two solutions to a homogeneous system
of 40 equations in 42 variables. The two solutions are not
multiples, and all other solutions can be constructed by adding
together appropriate multiples of these two solutions. Can the
scientist be certain that an associated nonhomogeneous
system (with the same coefficients) has a solution?
The Invertible Matrix Theorem (Continued)
Let A be an n n matrix. Then the following statements are
each equivalent to the statement that A is an invertible matrix.
n
m. The columns of A form a basis of  .
n. Col A   n
o. dim Col A  n
p. rank A  n
q. Nul A  {0}
r. Nullity A  0
Definition
The rank of A is the dimension of the column space of A.
Theorem 14 (The Rank Theorem)
The dimensions of the column space and the row space of an
m n matrix A are equal. This common dimension, the rank of
A, also equals the number of pivot positions in A and satisfies
rank A  dim Nul A  n
rank A  nullity A  n
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